Titlebook: Dynamics Reported; Expositions in Dynam Christopher K. R. T. Jones,Urs Kirchgraber,Hans-Ot Book 1996 Springer-Verlar Berlin Heidelberg 1996

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0936-6040 elp to gain the utmost degree of clarity. It is hoped, that DYNAMICS REPORTED will be useful for those entering the field and will stimulate an exchange of idea978-3-642-79933-4978-3-642-79931-0Series ISSN 0936-6040 Series E-ISSN 2942-8548

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Feedback Stabilizability of Time-Periodic Parabolic Equations,tem is autonomous (cf. [7], [40]). For the time-periodic infinite dimensional case some first steps have been made by A. Lunardi (cf. [33]). But before we embark on a description of our results we give an example as motivation for the kind of problems in control theory we shall be concerned with.

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Homoclinic Orbits in a Four Dimensional Model of a Perturbed NLS Equation: A Geometric Singular Perric singular perturbation theory. Next these homoclinic orbits are constructed, and studied, numerically with a bifurcation algorithm. These numerical studies find some members of the family of homoclinic orbits which were predicted by the theory. Finally, the existence of a chaotic symbol dynamics

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